Tangent-point repulsive potentials for a class of non-smooth m-dimensional sets in n. Part I: Smoothing and self-avoidance effects

Abstract

We consider repulsive potential energies q(), whose integrand measures tangent-point interactions, on a large class of non-smooth m-dimensional sets in n. Finiteness of the energy q() has three sorts of effects for the set : topological effects excluding all kinds of (a priori admissible) self-intersections, geometric and measure-theoretic effects, providing large projections of onto suitable m-planes and therefore large m-dimensional Hausdorff measure of within small balls up to a uniformly controlled scale, and finally, regularizing effects culminating in a geometric variant of the Morrey-Sobolev embedding theorem: Any admissible set with finite q-energy, for any exponent q>2m, is, in fact, a C1-manifold whose tangent planes vary in a H\"older continuous manner with the optimal H\"older exponent μ=1-(2m)/q. Moreover, the patch size of the local C1,μ-graph representations is uniformly controlled from below only in terms of the energy value q().